04/01/2011, 12:27 PM
i want to adress attention to cyclic points.
for instance f(z)^[a/2] must have the same fixpoint as f(z)^[a].
but if f(w) = q and f(q) = s and f(s) = w we are " in trouble ".
certain function are thus " in trouble " at certain points.
the super of f(z) or f(f(z)) should be similar.
is exp(z) " in trouble " ?
to avoid " trouble " we analyse f(z)^+real = z
or not ?
for instance f(z)^[a/2] must have the same fixpoint as f(z)^[a].
but if f(w) = q and f(q) = s and f(s) = w we are " in trouble ".
certain function are thus " in trouble " at certain points.
the super of f(z) or f(f(z)) should be similar.
is exp(z) " in trouble " ?
to avoid " trouble " we analyse f(z)^+real = z
or not ?
